Open AccessAn Interior Trust Region Approach for Nonlinear Minimization Subject to Bounds
Author(s) -
Thomas F. Coleman,
Yuying Li
Publication year - 1996
Publication title -
siam journal on optimization
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 2.066
H-Index - 136
eISSN - 1095-7189
pISSN - 1052-6234
DOI - 10.1137/0806023
Subject(s) - trust region , iterated function , mathematics , mathematical optimization , quadratic equation , quadratic programming , sequential quadratic programming , nonlinear programming , constraint (computer aided design) , simple (philosophy) , ellipsoid , convergence (economics) , interior point method , minification , nonlinear system , function (biology) , feasible region , subject (documents) , computer science , mathematical analysis , philosophy , computer security , economic growth , biology , geometry , epistemology , quantum mechanics , evolutionary biology , physics , radius , astronomy , library science , economics
We propose a new trust region approach for minimizing nonlinear functions subject to simple bounds. By choosing an appropriate quadratic model and scaling matrix at each iteration, we show that it is not necessary to solve a quadratic programming subproblem, with linear inequalities, to obtain an improved step using the trust region idea. Instead, a solution to a trust region subproblem is defined by minimizing a quadratic function subject only to an ellipsoidal constraint. The iterates generated by these methods are always strictly feasible. Our proposed methods reduce to a standard trust region approach for the unconstrained problem when there are no upper or lower bounds on the variables. Global and quadratic convergence of the methods is established; preliminary numerical experiments are reported.
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